Looking at your code, it is no wonder that you will run out of memory quite fast. Your method `divideFactorials`

calls the method factorial and uses as argument the difference "numerator-denominator". That difference is very likely going to be very large according to your code and you will be stuck in a very long loop in your factorial method.

If it is really just about finding nCk (which I assume because your comment in your code), just use:

```
public static long GetnCk(long n, long k)
{
long bufferNum = 1;
long bufferDenom = 1;
for(long i = n; i > Math.Abs(n-k); i--)
{
bufferNum *= i;
}
for(long i = k; i => 1; i--)
{
bufferDenom *= i;
}
return (long)(bufferNom/bufferDenom);
}
```

Of course using this method you will run out of range very fast, because a long does not actually support very long numbers, so n and k have to be smaller than 20.

Supposing that you actually work with very large numbers you could use doubles instead of longs, as the powers become more and more significant.

**Edit:**
If you use large numbers you could also use Stirling's Formula:

As n becomes large ln(n!) -> n*ln(n) - n.

Putting this into code:

```
public static double GetnCk(long n, long k)
{
double buffern = n*Math.Log(n) - n;
double bufferk = k*Math.Log(k) - k;
double bufferkn = Math.Abs(n-k)*Math.Log(Math.Abs(n-k)) - Math.Abs(n-k);
return Math.Exp(buffern)/(Math.Exp(bufferk)*Math.Exp(bufferkn));
}
```

I only propose this answer, as you said language independent, the C# code is just used to demonstrate it. Since you need to use large numbers for n and k for this to work, i propose this as a general way for finding the binomial coefficient for large combinations.

For cases were n and k are both smaller than around 200-300, you should use the answer Victor Mukherjee proposed, as it is exact.

**Edit2:**
Edited my first code.

`if (n > 20) throw new OverflowException();`

– Hans Passant Oct 19 '12 at 23:42